On the Covering Number of Small Symmetric Groups and Some Sporadic Simple Groups

Abstract

A set of proper subgroups is a covering for a group if its union is the whole group. The minimal number of subgroups needed to cover G is called the covering number of G, denoted by σ(G). Determining σ(G) is an open problem for many non-solvable groups. For symmetric groups Sn, Mar\'oti determined σ(Sn) for odd n with the exception of n=9 and gave estimates for n even. In this paper we determine σ(Sn) for n = 8, 9, 10 and 12. In addition we find the covering number for the Mathieu group M12 and improve an estimate given by Holmes for the Janko group J1.